The perturbation of Drazin inverse and dual Drazin inverse

IF 0.8 Q2 MATHEMATICS Special Matrices Pub Date : 2024-01-01 DOI:10.1515/spma-2023-0110

Hongxing Wang, Chong Cui, Yimin Wei

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Abstract

Abstract In this study, we derive the Drazin inverse ( A + ε B ) D {\left(A+\varepsilon B)}^{D} of the complex matrix A + ε B A+\varepsilon B with Ind ( A + ε B ) > 1 {\rm{Ind}}\left(A+\varepsilon B)\gt 1 and Ind ( A ) = k {\rm{Ind}}\left(A)=k and the group inverse ( A + ε B ) # {\left(A+\varepsilon B)}^{\#} of the complex matrix A + ε B A+\varepsilon B with Ind ( A + ε B ) = 1 {\rm{Ind}}\left(A+\varepsilon B)=1 and Ind ( A ) = k {\rm{Ind}}\left(A)=k when ε B \varepsilon B is viewed as the perturbation of A A . If the dual Drazin inverse (DDGI) A ^ DDGI {\widehat{A}}^{{\rm{DDGI}}} of A ^ \widehat{A} is considered as a notation. We calculate ( A + ε B ) D − A ^ DDGI {\left(A+\varepsilon B)}^{D}-{\widehat{A}}^{{\rm{DDGI}}} and ( A + ε B ) # − A ^ DDGI {\left(A+\varepsilon B)}^{\#}-{\widehat{A}}^{{\rm{DDGI}}} and obtain ‖ ( A + ε B ) D − A ^ DDGI ‖ P ∈ O ( ε 2 ) \Vert {\left(A+\varepsilon B)}^{D}-{\widehat{A}}^{{\rm{DDGI}}}{\Vert }_{P}\in {\mathcal{O}}\left({\varepsilon }^{2}) and ‖ ( A + ε B ) # − A ^ DDGI ‖ P ∈ O ( ε 2 ) \Vert {\left(A+\varepsilon B)}^{\#}-{\widehat{A}}^{{\rm{DDGI}}}{\Vert }_{P}\in {\mathcal{O}}\left({\varepsilon }^{2}) . Meanwhile, we give some examples to verify these conclusions.

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Drazin 逆和双重 Drazin 逆的扰动

Abstract In this study、我们推导了复矩阵 A + ε B A+\varepsilon B 的 Drazin 逆 ( A + ε B ) D {\left(A+\varepsilon B)}^{D} with Ind ( A + ε B ) > 1 {\rm{Ind}}\left(A+\varepsilon B)\gt 1 and Ind ( A ) = k {\rm{Ind}}\left(A)=k 以及群逆 ( A + ε B ) # {\left(A+\varepsilon B)}^{D}.+ ε B ) # {\left(A+\varepsilon B)}^{#} of the complex matrix A + ε B A+\varepsilon B with Ind ( A + ε B ) = 1 {\rm{Ind}}\left(A+\varepsilon B)=1 and Ind ( A ) = k {\rm{Ind}}\left(A)=k when ε B \varepsilon B is viewed as the perturbation of A A .如果把 A ^ \widehat{A}的对偶 Drazin 逆（DDGI）A ^ DDGI {\widehat{A}}^{{\rm{DDGI}} 视为一种符号。我们计算 ( A + ε B ) D - A ^ DDGI {\left(A+\varepsilon B)}^{D}-{\widehat{A}}^{\{rm{DDGI}}} 和 ( A + ε B ) # - A ^ DDGI {\left(A+\varepsilon B)}^{\#}-{\widehat{A}}^{rm{DDGI}}.{得到‖ ( A + ε B ) D - A ^ DDGI ‖ P∈ O ( ε 2 ) \Vert {left(A+\varepsilon B)}^{D}-{\widehat{A}}^{\rm{DDGI}}}{Vert }_{P}}\in {\mathcal{O}}}left({\varepsilon }^{2}) and ‖ ( A + ε B ) # - A ^ DDGI ‖ P ∈ O ( ε 2 ) \Vert {\left(A+\varepsilon B)}^{\#}-{in {\mathcal{O}}left({\varepsilon }^{2}) .同时，我们举一些例子来验证这些结论。

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来源期刊

Special Matrices MATHEMATICS-

CiteScore

1.10

自引率

20.00%

发文量

审稿时长

8 weeks

期刊介绍： Special Matrices publishes original articles of wide significance and originality in all areas of research involving structured matrices present in various branches of pure and applied mathematics and their noteworthy applications in physics, engineering, and other sciences. Special Matrices provides a hub for all researchers working across structured matrices to present their discoveries, and to be a forum for the discussion of the important issues in this vibrant area of matrix theory. Special Matrices brings together in one place major contributions to structured matrices and their applications. All the manuscripts are considered by originality, scientific importance and interest to a general mathematical audience. The journal also provides secure archiving by De Gruyter and the independent archiving service Portico.

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